12/1/2023 0 Comments Ratio tables sugar story 4th grade![]() ![]() Regular exercise and a diet plan can help lose weight. If you are overweight, losing weight can help in controlling your of blood sugar.Consult a doctor, a dietician and also a counselor and find out how to go about your tasks effectively.Q: How do I set about altering my lifestyle to counter diabetes? Make an appointment with a podiatrist if available when require.During medical check-ups get the leg and feet examined at least once a year.Walk and/or exercise regularly to help the circulation.Make lifestyle adjustments to avoid injuries.Keep the feet covered when traveling outdoors.Choose the correct foot wear and avoid tight fits.Learn to examine your feet including the soles of your feet.Step 4: Compare the value at the given point and find your answer. Step 3: Determine the mathematical operation and fill in the table. Step 2: Label the table and input the values in the first row as that is mentioned in the question. Ensure that the HbA1C is within a defined range The steps for creating a ratio table are: Step 1: Draw two columns for the comparison of the given ratio. ![]() The following measures can be taken to take care of diabetic feet( 16 ✔ ✔Trusted Source Like your face examine your feet daily and look for any bruises or cuts. So once again, not an equivalent ratio.Read More: Q: What are the measures required to take care of feet in diabetes?Ī: In one sentence, look after your feet as you would look after your face. So you're not multiplyingīy the same amount. And to go from 12 toġ6, you would multiply, that is, by 1 1/3. So this right over here would be, you would multiply by 1 1/2. You would multiply by, let's see, that's 1 1/2. So you'd be multiplying or dividing by different numbers here, so And to go from 12 to eight, so you could divide by To go from 16 to 12, how do we do that? Well, to go from 16 to 12, you could divide by four and multiply by three. So, this is also going toīe an equivalent ratio. So we're dividing by the same thing, each of these numbers. And to go from 12 to three, we are going to divide by four as well. What about four to three? Well, to go from 16 to four, we would have to divide by four. To go from 12 to 24, weĪlso multiply by two. What about 32 to 24? Well to go from 16 toģ2, we multiply by two. So, to get from 16 to eight, you could do that as, well, Get an equivalent ratio you can multiply or divide these numbers by the same number. So at first you might say well, gee, these numbers are smaller than 16 and 12. To select three ratios that are equivalent to 16 to 12. To go from six to 62, you multiply by 10 and 2/6 or 10 1/3, so this one is definitely not an equivalent ratio. And so we've already selected three, but let's just verify We multiply each of these by six and we keep the same order. And to go from six to thirty-six, we also multiply by six. What about 42 to 36? Well, to go from seven to 42, we're going to have to multiply by six. And to go from six to 18, you would also multiply by three. To go from seven to 21, we would multiply by three. So you would rule this one out even though it's dealing with And we're saying for every seven oranges, there are six apples. This could be ratio of oranges to apples. Now you might be tempted to pick 12 to 14, but that is not the same ratio. ![]() So before I even look at these choices, for example, if I have seven to six, if I multiply the seven times two to get 14, then I would also Through this together, and the main thing to realizeĪbout equivalent ratios is we just have to multiply or divide the corresponding parts of the ratio by the same amount. So pause this videoĪnd see if you can spot the three ratios that areĮquivalent to seven to six. To select three ratios that are equivalent to seven to six. Solution: Let us first write the given ratio as a fraction. Q.1: Find the equivalent ratios of 8 : 18. Then again we can write the resulting fraction as an equivalent ratio.Īlso, if we have to compare any two equivalent ratios, then we can divide the two quantities by the highest common factor and get the simplest form of ratio. Thus, to find a ratio equivalent to another we have to multiply the two quantities, by the same number.Īnother way to find equivalent ratios is to convert the given ratio into fraction form and then multiply the numerator and denominator by the same number to get equivalent fractions. The standard form of the ratio is given below:Īs we know, two or more ratios are equivalent if their simplified forms are the same. ![]()
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